1 / 99

Torsional oscillator and specific heat measurements on solid helium

Torsional oscillator and specific heat measurements on solid helium. PITP-Outing Lodge workshop, July 22, 2007. Moses Chan - Penn State. Outline. Introduction Torsional oscillator measurements on solid samples grown under constant temperature /constant pressure condition.

eadie
Download Presentation

Torsional oscillator and specific heat measurements on solid helium

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Torsional oscillator and specific heat measurements on solid helium PITP-Outing Lodge workshop, July 22, 2007 Moses Chan - Penn State

  2. Outline • Introduction • Torsional oscillator measurements on solid samples grown under constant temperature /constant pressure condition. • Thermal history studies • Specific heat measurements

  3. Solid Normal Liquid (He I) Superfluid (He II) Superfluidity in liquid 4He • Superfluid helium film can flow up a wall • Superfluid Fountain T=2.176K

  4. total energy zero-point energy • Lindemann Parameter the ratio of the root mean square of the displacement of atoms to the interatomic distance (da) A classical solid will melt if the Lindemann’s parameter exceeds the critical value of ~0.1 . • X-ray measurement of the Debye-Waller factor of solid helium at ~0.7K and near melting curve shows this ratio to be 0.262. (Burns and Issacs, Phys. Rev. B55, 5767(1997)) Zero-point Energy Inter-atomic potential

  5. Theoretical ‘consensus’ in 1970s: Superfluidity in solid is not impossible! - If solid 4He can be described by a Jastraw-type wavefunction that is commonly used to describe liquid helium then crystalline order (with finite fraction of vacancies) and BEC can coexist. G.V. Chester,Lectures in Theoretical Physics Vol XI-B(1969); Phys. Rev. A2, 256 (1970) J. Sarfatt, Phys. Lett.30A, 300 (1969) L. Reatto, Phys. Rev.183, 334 (1969) - Andreev and Liftshitz assume the specific scenario of zero-point vacancies and other defects ( e.g. interstitial atoms) undergoing BEC and exhibit superfluidity. Andreev & Liftshitz, Zh.Eksp.Teor.Fiz.56, 205 (1969).

  6. R Solid Helium The ideal method of detection of superfluidity is to subject solid to dc or ac rotation and look for evidence of nonclassical rotational inertia A. J. Leggett, PRL 25, 1543 (1970) Quantum exchange of particles arranged in an annulus under rotation leads to a measured moment of inertia that is smaller than the classical value I(T)=Iclassical[1-fs(T)] fs(T) is the supersolid fraction Its upper limit is estimated by different theorists to range from 10-6 to 0.4; Leggett: 10-4

  7. Torsion rod 3.5 cm Torsion cell f Amp f0 Detection Drive Torsional Oscillator Technique is ideal for the detection of superfluidity Quality Factor Q= f0 / f ~106 Stability in the period is ~0.1 ns Frequency resolution of 1 part in 107 Mass sensitivity of ~10-7 g f~ 1kHz

  8. Torsional oscillator studies of superfluid films Vycor Δ I total= I cell+ I helium film, Above Tc the adsorbed normal liquid film behaves as solid and oscillates with the cell. In the superfluid phase, helium film decouples from oscillation. Hence Itotal and drops.  Berthold,Bishop,Reppy, PRL39,348(1977)

  9. Blocked capillary (BC) method of growing solid samples heat drain solid blocks fill-line Be-Cu torsion rod and fill-line gravity

  10. Period shifted by 4260ns due to mass loading of solid helium Solid 4He at 62 bars in Vycor glass *=966,000ns

  11.  Supersolid response of helium in Vycor glass • Period drops at 175mK •  appearance of NCRI • size of period drop • - ~17ns *=971,000ns

  12. Solid helium in Vycor glass 7nm f0=1024Hz 62bar Total mass loading = 4260ns Measured decoupling, -o=17ns NCRIF = 0.4% (with tortuosity, 2% ) -*[ns] E. Kim & M.H.W. Chan, Nature 427, 225 (2004). *=971,000ns

  13. Solid helium in porous gold 490nm f0=359Hz 27bar Total mass loading = 1625ns Measured decoupling, -o=13ns NCRIF = 0.8% (with tortuosity, 1.2% ) E. Kim & M.H.W. Chan, JLTP 138, 859 (2005).

  14. Bulk solid helium in annulus Torsion cell with helium in annulus Filling line Channel OD=10mm Width=0.63mm Torsion rod Mg disk 3.5 cm Torsion cell Al shell Detection Solid helium in annular channel Drive

  15. Bulk solid helium in annulus f0=912Hz 51bar Total mass loading = 3012ns Measured decoupling, -o=41ns NCRIF = 1.4% E. Kim & M.H.W. Chan, Science 305, 1941 (2004)

  16. Non-Classical Rotational Inertia Fraction ρS/ρ |v|max Total mass loading =3012ns at 51 bars

  17. Irrotational Flow • Superfluids exhibit potential (irrotational) flow • For our exact dimensions, NCRIF in the blocked cell should be about 1% that of the annulus* *E. Mueller, private communication.

  18. Solid 4He at various pressures show similar temperature dependence, but the measured supersolid fraction shows scatter with no obvious pressure dependence NCRIF NCRIF NCRIF NCRIF

  19. Pressure dependence of supersolid fraction Blue data points were obtained by seeding the solid helium samples from the bottom of the annulus. NCRIF What are the causes of the scatter in NCRIF?

  20. Large number of experimental parameters. • Pressure • Oscillation speed. • 3. 3He concentration ( Eunseong Kim) • 4. Sample geometry/ crystal quality • 5 . Frequency of measurement ( Kojima)

  21. Strong and ‘universal’ velocity dependence in all annular samples ω R vC~ 10µm/s =3.16µm/s for n=1 Vortices are important

  22. 3He Effect Eunseong Kim E. Kim, J. S. Xia, J. T. West, X. Lin, and M. H. W. Chan, To be published.

  23. 3He Effect of solid 4He in Vycor Data shifted vertically for easy comparison

  24. Nonclassical rotational inertia results have been replicated in four labs. • The temperature dependence of NCRI is reproduced. • However, the magnitude of NCRI varies from 0.03% up to 20%(!!) • NCRI in cell with simple cylindrical geometry appears to be smaller than that in annular geometry. • 20% NCRI was seen by Rittner and Reppy in solid confined in a very narrow annulus of 0.15mm in width.

  25. NCRI in open geometry appears to be smaller than in an annulus

  26. Annealing effects Quenched samples show large NCRI (~0.5%) Annealed samples show NCRI < 0.05% Velocities are between 9mm/s and 45mm/s f0=185Hz A.S. Rittner & J.D. Reppy, PRL 97, 165301 (2006).

  27. The variation in NCRI and the annealing effect seen by Rittner and Reppy suggest disorder in solid at least enhances NCRI. • What kind of disorder? Vacancies and interstitials, dislocation lines and grain boundaries. • It has been proposed that the observed effect is due to superfluid film flow along the grain boundaries.

  28. Crystal Growth • High quality single crystals have been grown under constant temperature1 and pressure2 • Best crystals grown in zero temperature limit 1. O.W. Heybey & D.M. Lee, PRL 19, 106 (1967); S. Balibar, H. Alles & A. Ya Parshin, Rev. Mod. Phys. 77, 317 (2005). 2. L.P. Mezhov-Deglin, Sov. Phys. JETP 22, 47 (1966); D.S. Greywall, PRA 3, 2106 (1971).

  29. Constant T/P growth from superfluid (1ppb 3He) Heat in Heat out Q ~ 500,000 Tony Clark and Josh West

  30. BC samples can also be grown Heat out Q ~ 500,000

  31. NCRI in solid helium (1ppb 3He) • Samples grown carefully from superfluid collapse onto • one curve for T > 40mK and share common onset • temperature, TC ~ 80mK • NCRIF ~ 0.3%

  32. NCRI in solid helium (1ppb 3He) • Samples grown carefully from superfluid collapse onto \ • one curve for T > 40mK and share common onset • temperature, TC ~ 80mK • NCRIF ~ 0.3%

  33. NCRI in solid helium (1ppb 3He) • Samples grown carefully from superfluid collapse onto • one curve for T > 40mK and share common onset • temperature, TC ~ 80mK • NCRIF ~ 0.3%

  34. NCRI in solid helium (1ppb 3He) • Samples grown carefully from superfluid collapse onto • one curve for T > 40mK and share common onset • temperature, TC ~ 80mK • NCRIF ~ 0.3%

  35. NCRI in solid helium (1ppb 3He) • Samples grown carefully from superfluid collapse onto • one curve for T > 40mK and share common onset • temperature, TC ~ 80mK • NCRIF ~ 0.3%

  36. NCRI in solid helium (1ppb 3He) • Samples grown carefully from superfluid collapse onto • one curve for T > 40mK and share common onset • temperature, TC ~ 80mK • NCRIF ~ 0.3%

  37. NCRI in solid helium (1ppb 3He) • Samples grown carefully from superfluid collapse onto • one curve for T > 40mK and share common onset • temperature, TC ~ 80mK • NCRIF ~ 0.3%

  38. Comparison of BeCu & AgCu cells -For a particular cell, NCRIF in BC samples > NCRIF in CT/CP samples -TO also higher in BC samples -Order of magnitude difference in NCRIF between two cells

  39. Annealing in AgCu cell (300ppb) NCRIF increases upon annealing TF =2.2K (45.5bar) 1st anneal: 5hr at 1.75K 2nd anneal: ~20min above 1.5K

  40. Annealing in BeCu cell (1ppb) -Annealing BC samples usually decreases large NCRIF’s -CT sample unchanged -Need to be very close to TF for high pressure samples -Most dramatic change occurs in (likely polycrystalline) sample at low pressure

  41. Annealing of CT sample Melting temperature = 1.38K

  42. Annealing of CT sample Melting temperature = 1.38K 2 hour anneal at 1.28K

  43. Annealing of CT sample Melting temperature = 1.38K Additional 37 hours near 1.35K

  44. Annealing of BC sample Again

  45. Annealing of BC sample NCRIF, Q -1, and TO converge on that of the CT sample

  46. Reproducible results (1ppb) 8 CT samples & 1 annealed BC sample collapse onto a single curve above 40mK

  47. High temperature tail of NCRI Transition broadened in BC samples (probably “polycrystalline”) and by 3He impurities

  48. Grain boundaries surely cannot be the sole mechanism. • What then is the cause for variation in NCRI from cell to cell? • Dislocation lines with density that ranges from 105 cm-2 to 1010 cm-2 and in particular how the interaction of vortices and 3He with dislocation lines are important.

  49. Annealing of BC sample Annealing lowers NCRIF, TO, and Q -1 peak

  50. Anderson’s vortex liquid model Just a few details: -”Free” vortices (relative to time scale of oscillator = resonant period) can respond to motion of oscillator and screen supercurrents, reducing measured NCRIF -NCRI related to susceptibility of vortices: NCRIF largest when they are “pinned” -3He may attach to vortices and slow them down (higher TO) -Dissipation peak: vortex rate of motion ~ oscillator frequency (higher frequency, higher TO) P.W. Anderson, Nature Phys. 3, 160 (2007).

More Related